Understanding Cryptography Chapter 13 – Key Establishment
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Understanding Cryptography by Christof Paar and Jan Pelzl
www.crypto-textbook.com
Chapter 13 – Key Establishment ver. Jan 7, 2010
These slides were prepared by Christof Paar and Jan Pelzl
§ The slides can used free of charge. All copyrights for the slides remain with Christof Paar and Jan Pelzl.
§ The title of the accompanying book “Understanding Cryptography” by Springer and the author’s names must remain on each slide.
§ If the slides are modified, appropriate credits to the book authors and the book title must remain within the slides.
§ It is not permitted to reproduce parts or all of the slides in printed form whatsoever without written consent by the authors.
Some legal stuff (sorry): Terms of Use
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§ Introduction
§ The n2 Key Distribution Problem
§ Symmetric Key Distribution
§ Asymmetric Key Distribution - Man-in-the-Middle Attack
- Certificates
- Public-Key Infrastructure
Content of this Chapter
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Classification of Key Establishment Methods
In an ideal key agreement protocol, no single party can control what the key value will be.
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It is often desirable to frequently change the key in a cryptographic system.
Reasons for key freshness include:
- If a key is exposed (e.g., through hackers), there is limited damage if the key is
changed often
- Some cryptographic attacks become more difficult if only a limited amount of ciphertext was generated under one key
- If an attacker wants to recover long pieces of ciphertext, he has to recover several keys which makes attacks harder
Key Freshness
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Key Derivation
§ In order to achieve key freshness, we need to generate new keys frequently.
§ Rather than performing a full key establishment every time (which is costly in terms of computation and/or communication), we can derive multiple session keys kses from a given key kAB.
§ The key kAB is fed into a key derivation function together with a nonce r („number used only once“).
§ Every different value for r yields a different session key
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Key Derivation
§ The key derivation function is a computationally simple function, e.g., a block cipher or a hash function
Alice Bob
generate nonce r
derive session key Kses= ekAB (r)
r
derive session key Kses= ekAB (r)
§ Example for a basic protocol:
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§ Introduction
§ The n2 Key Distribution Problem
§ Symmetric Key Distribution
§ Asymmetric Key Distribution - Man-in-the-Middle Attack
- Certificates
- Public-Key Infrastructure
Content of this Chapter
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The n2 Key Distribution Problem
§ Simple situation: Network with n users. Every user wants to communicate securely with every of the other n-1 users.
§ Naïve approach: Every pair of users obtains an individual key pair
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The n2 Key Distribution Problem
Shortcomings
§ There are n (n-1) ≈ n2 keys in the system
§ There are n (n-1)/2 key pairs
§ If a new user Esther joins the network, new keys kXE have to be transported via secure channels (!) to each of the existing usersa
⇒ Only works for small networks which are relatively static
Example: mid-size company with 750 employees
§ 750 x 749 = 561,750 keys must be distributed securely
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§ Introduction
§ The n2 Key Distribution Problem
§ Symmetric Key Distribution
§ Asymmetric Key Distribution - Man-in-the-Middle Attack
- Certificates
- Public-Key Infrastructure
Content of this Chapter
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Key Establishment with Key Distribution Center
Alice Bob
derive session key Kses= eKA (yA)
KDC KEK: kA KEKs: kA , kB KEK: kB
RQST (IDA ,IDB) generate session key kses
yA = eKA (kses) yB = eKB (kses)
yA yB
derive session key Kses= eKB (yB)
y= eKses (x) y x= e-1Kses (y)
§ Key Distribution Center (KDC) = Central party, trusted by all users
§ KDC shares a key encryption key (KEK) with each user
§ Principle: KDC sends session keys to users which are encrypted with KEKs
message y
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Key Establishment with Key Distribution Center
§ Advantages over previous approach:
- Only n long-term key pairs are in the system
- If a new user is added, a secure key is only needed between the user and the KDC (the other users are not affected)
- Scales well to moderately sized networks
§ Kerberos (a popular authentication and key distribution protocol) is based on KDCs
§ More information on KDCs and Kerberos: Section 13.2 of Understanding Cryptography
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Key Establishment with Key Distribution Center
Remaining problems:
§ No Perfect Forward Secrecy: If the KEKs are compromised, an attacker can decrypt past messages if he stored the corresponding ciphertext
§ Single point of failure: The KDC stores all KEKs. If an attacker gets access to this database, all past traffic can be decrypted.
§ Communication bottleneck: The KDC is involved in every communication in the entire network (can be countered by giving the session keys a long life time)
§ For more advanced attacks (e.g., key confirmation attack): Cf. Section 13.2 of Understanding Cryptography
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§ Introduction
§ The n2 Key Distribution Problem
§ Symmetric Key Distribution
§ Asymmetric Key Distribution - Man-in-the-Middle Attack
- Certificates
- Public-Key Infrastructure
Content of this Chapter
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Alice
Recall: Diffie–Hellman Key Exchange (DHKE)
Bob
Choose random private key kprA = a ∈ {1, 2,…, p-1}
Choose random private key kprB = b ∈ {1, 2,…, p-1}
Compute public key kpubA = A = αa mod p
Compute public key kpubB = B = αb mod p
Compute common secret kAB = Ba = (αa)b mod p
Compute common secret kAB = Ab = (αb)a mod p
A
B
§ Widely used in practice
§ If the parameters are chosen carefully (especially a prime p > 21024), the DHKE is secure against passive (i.e., listen-only) attacks
§ However: If the attacker can actively intervene in the communciation, the man-in-the-middle attack becomes possible
Public parameters α, p
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Alice
Man-in-the-Middle Attack
Bob kprA = a kpubA = A = αa mod p
kAO = (B´)a mod p
A
§ Oscar computes a session key kAO with Alice, and kBO with Bob
§ However, Alice and Bob think they are communicationg with each other !
§ The attack efficiently performs 2 DH key-exchanges: Oscar-Alice and Oscar-Bob
§ Here is why the attack works:
kprB = b
Oscar
kpubB = B = αb mod p A´ substitute A´ = αo mod p
B´ B substitute B´ = αo mod p
kBO = (A´)b mod p kAO = Ao mod p
kBO = Bo mod p
Alice computes: kAO = (B´)a = (αo)a
Oscar computes: kAO = Ao = (αa)o
Bob computes: kBO = (A´)b = (αo)b
Oscar computes: kBO = Bo = (αa)o
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Alice
Implications of the Man-in-the-Middle Attack
Bob kprA = a kpubA = A = αa mod p
kAO = (B´)a mod p
A
§ Oscar has no complete control over the channel, e.g., if Alice wants to send an encrypted message x to Bob, Oscar can read the message:
kprB = b
Oscar
kpubB = B = αb mod p A´ substitute A´ = αo mod p
B´ B substitute B´ = αo mod p
kBO = (A´)b mod p kAO = Ao mod p
kBO = Bo mod p
y = AESkA,O (x) y
decrypt x = AES-1kA,O (y)
re-encrypt y´= AESkB,O (x) y´
x = AES-1kB,O (y´)
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Very, very important facts about the Man-in-the-Middle Attack
§ The man-in-the-middle-attack is not restricted to DHKE; it is applicable to any public-key scheme, e.g. RSA encryption. ECDSA digital signature, etc. etc.
§ The attack works always by the same pattern: Oscar replaces the public key from one of the parties by his own key.
§ The attack is also known as MIM attack or Janus attack
§ Q: What is the underlying problem that makes the MIM attack possible?
§ A: The public keys are not authenticated: When Alice receives a public key which is allegedly from Bob, she has no way of knowing whether it is in fact his. (After all, a key consists of innocent bits; it does not smell like Bob‘s perfume or anything like that)
Even though public keys can be sent over unsecure channels, they require authenticated channels.
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§ Introduction
§ The n2 Key Distribution Problem
§ Symmetric Key Distribution
§ Asymmetric Key Distribution - Man-in-the-Middle Attack
- Certificates
- Public-Key Infrastructure
Content of this Chapter
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Certificates
§ In order to authenticate public keys (and thus, prevent the MIM attack) , all public keys are digitally signed by a central trusted authority.
§ Such a construction is called certificate
certificate = public key + ID(user) + digital signature over public key and ID
§ In its most basic form, a certificate for the key kpub of user Alice is:
Cert(Alice) = (kpub, ID(Alice), sigKCA(kpub,ID(Alice) )
§ Certificates bind the identity of user to her public key
§ The trusted authority that issues the certificate is referred to as certifying authority (CA)
§ „Issuing certificates“ means in particular that the CA computes the signature sigKCA(kpub) using its (super secret!) private key kCA
§ The party who receives a certificate, e.g., Bob, verifies Alice‘s public key using the public key of the CA
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Alice
Diffie–Hellman Key Exchange (DHKE) with Certificates
Bob
verify certificate verKpub,CA (Cert(Bob))
if verification is correct: Compute common secret kAB = Ba = (αa)b mod p
if verification is correct: Compute common secret kAB = Ab = (αb)a mod p
Cert(Alice)
kprA = a
kpubA = A
Cert(Alice) = ((A, IDA), sigKCA (A,IDA))
Cert(Bob)
kprB = b
kpubB = B = αb mod p
Cert(Bob) = ((B, IDB), sigKCA (B,IDB))
verify certificate verKpub,CA (Cert(Alice))
CA Cert(Alice) Cert(Bob)
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§ Note that verfication requires the public key of the CA for verKpub,CA
§ In principle, an attacker could run a MIM attack when kpub,CA is being distributed
⇒ The public CA keys must also be distributed via an authenticated channel!
Certificates
§ Q: So, have we gained anything? After all, we try to protect a public key (e.g., a DH key) by using yet another public-key scheme (digital signature for the certificate)?
§ A: YES! The difference from before (e.g., DHKE without certificates) is that we only need to distribute the public CA key once, often at the set-upt time of the system
§ Example: Most web browsers are shipped with the public keys of many CAs. The „authenticated channel“ is formed by the (hopefully) correct distribution of the original browser software.
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§ Introduction
§ The n2 Key Distribution Problem
§ Symmetric Key Distribution
§ Asymmetric Key Distribution - Man-in-the-Middle Attack
- Certificates
- Public-Key Infrastructure
Content of this Chapter
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Definition: The entire system that is formed by CAs together with the necessary support mechanisms is called a public-key
infrastructure (PKI).
Public-Key Infrastructure
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§ In the wild certificates contain much more information than just a public key and a signature.
§ X509 is a popular signature standard. The main fields of such a certificate are shown to the right.
§ Note that the „Signature“ at the bottom is computed over all other fields in the certifcate (after hashing of all those fields).
§ It is important to note that there are two public-key schemes involved in every certificate:
1. The public-key that actually is protected by the signature („Subject‘s Public Key“ on the right). This was the public Diffie-Hellman key in the earlier examples.
2. The digital signature algorithm used by the CA to sign the certificate data.
§ For more information on certificates, see Section 13.3 of Understanding Cryptography
Certificates in the Real World
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There are many additional problems when certificates are to be used in systems with a large number of participants. The more pressing ones are:
1. Users communicate which other whose certificates are issued by different CAs
- This requires cross-certification of CAs, e.g.. CA1 certifies the public-key of CA2. If Alice trusts „her“ CA1, cross-certification ensures that she also trusts CA2. This is called a „chain of trust“ and it is said that „trust is delegated“.
2. Certificate Revocation Lists (CRLs)
- Another real-world problem is that certificates must be revoced, e.g., if a smart card with certificate is lost or if a user leaves an organization. For this, CRLs must be sent out periodically (e.g., daily) which is a burden on the bandwidth of the system.
More information on PKIs and CAs can be found in Section 13.3 of Understanding Cryptography
Remaining Issues with PKIs
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